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Lectures 10 and 11 Laser Guide Stars Claire Max Astro 289, UC Santa Cruz February 11 and 16, 2016 Page 1 First, some images of the summit of Mauna Kea, HI • Keck 2 Subaru Page 2 • Movie of 3 lasers in operation on Mauna Kea, HI: https://vimeo.com/24338510 Page 3 Outline of lectures on laser guide stars • Why are laser guide stars needed? • Principles of laser scattering in the atmosphere – Rayleigh scattering, resonant scattering from sodium • What is the sodium layer? How does it behave? • Physics of sodium atom excitation • Lasers used in astronomical laser guide star AO • Wavefront errors for laser guide star AO Page 4 Laser guide stars: Main points • Laser guide stars are needed because there aren’t enough bright natural guide stars in the sky – Hence YOUR favorite galaxy probably won’t have a bright enough natural guide star nearby • Solution: make your own guide star using lasers – Nothing special about coherent light - could use a flashlight hanging from a “giant high-altitude helicopter” – Size on sky has to be ≲ diffraction limit of a WFS sub-aperture • Laser guide stars have pluses and minuses: – Pluses: can put them anywhere, can be bright – Minuses: NGS give better AO performance than LGS even when both are working perfectly. High-powered lasers are tricky to build and work with. Laser safety is added complication. Page 5 Two types of laser guide stars in use today: “Rayleigh” and “Sodium” • Sodium guide stars: excite atoms in “sodium layer” at altitude of ~ 95 km ~ 95 km • Rayleigh guide stars: Rayleigh scattering from air molecules sends light back into telescope, h ~ 10 km 8-12 km • Higher altitude of sodium layer is closer to sampling the same turbulence that a star from “infinity” passes through Turbulence Telescope Page 6 Reasons why laser guide stars can’t do as well as bright natural guide stars 1) Laser light is spread out by turbulence on the way up. – Spot size is finite (0.5 - 2 arc sec) – Can increase measurement error of wavefront sensor » Harder to find centroid if spot is larger 2) For Rayleigh guide stars, some turbulence is above altitude where light is scattered back to telescope. - Hence it can’t be measured. 3) For both kinds of guide stars, light coming back to telescope is spherical wave, but light from “real” stars is plane wave – Some turbulence around edges of the pupil isn’t sampled well Page 7 Laser beacon geometry causes measurement errors Credit: Hardy Page 8 Why are laser guide stars needed? • Wavefront error due to anisoplanatism: æqö sf = ç ÷ è q0 ø 5/3 2 æ r0 ö q 0 @ 0.314 ç ÷ èhø æ z dz C (z) ö ò h ºç ÷ 2 çè ò dz C N (z) ÷ø 5/3 2 N 3/5 Example: At Keck θ0 ~ 10 arc sec x ( λ / 0.5 micron)6/5 What is σϕ2 for θ = 40 arc sec at λ = 1 micron? What is Strehl loss due to anisoplanatism? Answers: σϕ2 = 2.52 rad2, Strehl = 0.08 x Strehl at θ = 0 Page 9 How many bright stars are there? • There are about 6 million stars in the whole sky brighter than 13th magnitude • Area of sky = 4 r2 = 4 (360 / 22 sky contains (360 deg)2 / sq deg = 41253 sq deg • Question: How many stars brighter than 13th mag are there per square arc sec on the sky? Page 10 If we can only use guide stars closer than ~ 40 arc sec, sky coverage is low! • High-order Shack-Hartmann AO systems typically need guide stars brighter than magnitude V ~ 13.5 [V band: central wavelength ~ 0.54 m] • Surface density of these stars on the sky is Σ ~ 10-5 / (arc sec)2 • So probability P of finding bright enough guide star w/in radius of 40 arc sec of an arbitrary place in the sky is P = Σ (40)2 = 10-5 (40)2 = 0.05 • Magnitude V ~ 13.5 stars only have 5% sky coverage! Page 11 Sky coverage for curvature sensing AO system • Can use fainter guide stars, sometimes at expense of lower Strehl ratio • Graph trades off guide star brightness with distance from guide star Page 12 Solution: make your own guide star using a laser beam • Point the laser beam directly at YOUR favorite astronomical target • Use scattering of laser light by the atmosphere to create an “artificial” guide star – Sometimes called “synthetic beacon” or “artificial beacon” • What physical mechanism causes the laser light to scatter back down into your telescope’s wavefront sensor? Page 13 Scattering: 2 different physical processes • Rayleigh Scattering (Rayleigh beacon) – Elastic scattering from atoms or molecules in atmosphere. Works for broadband light, no change in frequency • Resonance Scattering (Sodium Beacon) – Line radiation is absorbed and emitted with no change in frequency. Page 14 Regardless of the type of scattering... Number of photons detected = (number of transmitted photons x probability that a transmitted photon is scattered x probability that a scattered photon is collected x probability that a collected photon is detected) + background photons (noise) Page 15 Amount of Photon Scattering nph = # of photons beam = laser beam crosssection nmol = density of scatterers B = scattering cross-section • # molecules hit by laser beam in volume beam z = nmol (σbeam z ) • Percentage of beam scattered = [ nmol ( beam z ) ] B /beam • Total number of photons scattered = ( EL / h ) ( nmolσB z ) • EL and are laser’s energy and frequency, h is Planck’s constant Page 16 Percentage of photons collected • Assuming uniform emission over 2 steradians, scattered photons are uniformly distributed over area 2p p 2 sinq dq df = 4p R2 R òò 0 0 • Percentage of photons collected = AR / ( 4 R2) where AR is receiver area Page 17 LIDAR Equation (LIght Detection And Ranging) Number of photons detected in range interval z N(z) = æ EL ö ç ÷ h n è ø Percentage of beam scattered (s n (z)Dz ) Initial number of photons B mol Transmission thru optics and atmosphere, detector efficiency æ ö A R ç ÷ çè 4p z2 ÷ø ( ) T T2 h + N opt Percentage of scattered photons that are collected Atm B Background photons Page 18 Rayleigh Scattering • Due to interactions of the electromagnetic wave from the laser beam with molecules in the atmosphere. • The light’s electromagnetic fields induce dipole moments in the molecules, which then emit radiation at same frequency as the exciting radiation (elastic scattering). Page 19 Rayleigh Scattering cross section • Rayleigh backscattering cross section is ds R (q = p ) 5.5 ´ 10 -28 2 -1 s = @ cm sr 4 dW l 0.55 m m R B ( ) where λ is laser wavelength • Scattering ∝ λ- 4 ⇒ use shorter wavelength lasers for better scattering efficiency • Why sunsets look red: Page 20 Dependence of Rayleigh scattering on altitude where the scattering occurs • Product of Rayleigh scattering cross section with density of molecules is s n R B mol @ 3.6 ´ 10 -31 P(z) -4.0117 -1 -1 l m sr T (z) where P(z) is the pressure in millibars at altitude z, and T(z) is temperature in degrees K at altitude z • Because pressure P(z) falls off exponentially with altitude, Rayleigh beacons are generally limited to altitudes below 8 - 12 km Page 21 Rayleigh laser guide stars use timing of laser pulses to detect light from z • Use a pulsed laser, preferably at a short wavelength (UV or blue or green) to take advantage of λ-4 • Cut out scattering from altitudes lower than z by taking advantage of light travel time z/c • Only open shutter of your wavefront sensor when you know that a laser pulse has come from the desired scattering volume z at altitude z Page 22 Rayleigh laser guide stars MMT laser guide star, Arizona • LBT ARGOS laser guide star • Starfire Optical Range, NM. Quite a few years ago. Robo-AO UV laser Page 23 Sodium Resonance Fluorescence • Resonance scattering occurs when incident laser is tuned to a specific atomic transition. • Absorbed photon raises atom to excited state. Atom emits photon of same wavelength via spontaneous or stimulated emission, returning to original lower state. • Large absorption and scattering cross-sections. • Layer in mesosphere ( h ~ 95 km, h ~ 10 km) containing alkali metals, sodium (103 - 104 atoms/cm3), potassium, calcium • Strongest laser return is from D2 line of Na at 589 nm. Page 24 Outline of laser guide star topics Why are laser guide stars needed? ✔ Principles of laser scattering in the atmosphere • What is the sodium layer? How does it behave? • Physics of sodium atom excitation • Lasers used in astronomical laser guide star AO • Wavefront errors for laser guide star AO Page 25 The atmospheric sodium layer: altitude ~ 95 km , thickness ~ 10 km Credit: Clemesha, 1997 Credit: Milonni, LANL • Layer of neutral sodium atoms in mesosphere (height ~ 95 km) • Thought to be deposited as smallest meteorites burn up Page 26 Rayleigh scattering vs. sodium resonance fluorescence • Atmosphere has ~ exponential density profile: æ Mg z ö è kT ÷ø - Ñ(nkT ) = nMg Þ n(z) = no exp- ç • M = molecular mass, n = no. density, T = temperature, k = Planck’s constant, g = gravitational acceleration Cartoon • Rayleigh scattering dominates over sodium fluorescence scattering below h = 75 km. Page 27 Rayleigh scattering vs. sodium resonance fluorescence • Atmosphere has ~ exponential density profile: æ Mg z ö è kT ÷ø - Ñ(nkT ) = nMg Þ n(z) = no exp- ç • M = molecular mass, n = number density, T = temperature, k = Planck’s constant, g = gravitational acceleration Real data: Kumar et al. 2007 • Rayleigh scattering dominates over sodium fluorescence scattering below h = 75 km. Page 28 Image of sodium light taken from telescope very close to main telescope View is highly foreshortened Light from Na layer at ~ 100 km Max. altitude of Rayleigh ~ 35 km Rayleigh scattered light from low altitudes Page 29 Can model Na D2 transition as a two-level atom (one valence electron) Hyperfine splitting Hyperfine splitting (not to scale) • Hyperfine splitting: spins of valence electron and nucleus are (or are not) aligned • Separation between upper three hyperfine states is small • Separation bet. two ground states is large: 1.8 GHz Page 30 Overview of sodium physics • Column density of sodium atoms is relatively low – Less than 600 kg in whole Earth’s sodium layer! • When you shine a laser on the sodium layer, the optical depth is only a few percent. Most of light just keeps on going upwards. • Natural lifetime of D2 transition is short: 16 nsec • Can’t just pour on more laser power, because sodium D2 transition saturates: – Once all the atoms that CAN be in the excited state ARE in the excited state, return signal stops increasing even with more laser power Page 31 Origin of sodium layer • Layer 10 km thick, at an altitude of 90 km - 105 km in the Earth’s “mesosphere” • Thought to be due to meteorites: at this altitude, small meteorites aimed toward the Earth first get hot enough to evaporate – Deposit their elements in atmosphere in atomic state: iron, potassium, sodium, lithium, ….. – Atomic layer is “eaten away” at its bottom by chemical reactions (e.g. oxidation reactions) Page 32 Sodium abundance varies with season 70°N Equator 40°N 20°S • Equatorial regions: density is more constant over the year, but peak is lower • Temperate regions: lowest density in summer – Chemical reactions at bottom of layer: Na sodium bicarbonate Page 33 Time variation of Na density profiles over periods of 4 - 5 hours Night 1: single peaked Night 2: double peaked At La Palma, Canary Islands Page 34 Page 35 Variability during night (UBC Na Lidar, Thomas Pfrommer) Page 36 Outline of laser guide star topics Why are laser guide stars needed? ✔ Principles of laser scattering in the atmosphere ✔ What is the sodium layer? How does it behave? • Physics of sodium atom excitation • Lasers used in astronomical laser guide star AO • Wavefront errors for laser guide star AO Page 37 Atomic processes for two-level atom • Einstein, 1916: atom interacts with light in 3 ways – Spontaneous emission æ dN1 ö = A21 N 2 çè ÷ø dt spont – Stimulated emission æ dN1 ö çè ÷ = B21 N 2U (n ) dt ø stim Graphics credit: Wikipedia – Absorption æ dN1 ö çè ÷ø = -B12 N1U (n ) dt abs N1, N2 = density of atoms in states 1 and 2; U (n ) = radiation density Page 38 Saturation effects in the Na layer, from Ed Kibblewhite’s chapter in Reader • Consider a two level atom which initially has a ground state n containing Nn atoms and an empty upper state m. The atom is excited by a radiation field tuned to the transition = Em- En/h, • In equilibrium h >> kT Bnm U( ) Nn = AmnNm +Bmn U( ) Nm Amn is Einstein's A coefficient (= 1/lifetime in upper state). Bnm = Bmn = Einstein’s B coefficient. U( ) is the radiation density in units of Joules/cm3 Hz Page 39 Check units: (cm3 Hz / erg) sec-1 # atoms Bnm U( ) Nn = Amn Nm + Bmn U( ) Nm ergs / cm3 Hz sec-1 per atom Page 40 Saturation, continued • Solve for Nm = Nn Bnm U( ) / [ Bnm U( ) + Amn] • If we define the fraction of atoms in level m as f and the fraction in level n as ( 1 - f ) we can rewrite this equation as f = Bmn U( ) (1 - f ) / (Bmn U( ) + Amn) f = 1/[2 + Amn/ BmnU( )] • This equation shows that at low levels of radiation U( ) the fraction of atoms in the upper level is Bmn U( ) / Amn • As the radiation density increases, fraction of atoms in upper level saturates to a maximum level of 1/2 for an infinite value of U ( ). • Define a saturation level as radiation field generating 1/2 this max: Usat( ) = Amn/2Bmn Page 41 Usat is not a cliff: fraction in upper state keeps increasing for U >> Usat Fraction in upper state vs. U/Usat 0.50 0.45 Fraction in upper state 0.40 0.35 0.30 0.25 0.20 0.15 linear response to increased laser power 0.10 0.05 0.00 0 1 2 3 4 5 6 7 8 9 10 U/Usat Page 42 Saturation, continued • The ratio Amn/Bmn is known from Planck's black body formula and is equal to 8h 3/c3 joules cm-3 Hz • The intensity of the radiation field I ( ) is related to U ( ) by I ( ) = U ( ) c watts/cm2 Hz Isat ≈ 9.48 mW/cm2 for linearly polarized light • In terms of photons Nsat = a few x 1016 photons/sec. Page 43 CW lasers produce more return/watt than pulsed lasers because of lower peak power • Lower peak power ⇒ less saturation 3 3 CW = “continuous wave” = always “on” Keck requirement: 0.3 ph/ms/cm2 Page 44 Laser guide stars: Main points so far • Laser guide stars are needed because there aren’t enough bright natural guide stars in the sky • Solution: make your own guide star – Using lasers – Nothing special about coherent light – Size on sky has to be ≲ diffraction limit of a WFS sub-aperture • Rayleigh scattering: from ~10-15 km: – Doesn’t sample turbulence as well as resonant scattering from Na layer at ~100 km. Lasers are cheaper, and easier to build. • Sodium laser guide stars: – Sodium column density varies with season, and within a night – Need to sense variation and follow it Page 45 Outline of laser guide star topics Why are laser guide stars needed? ✔ Principles of laser scattering in the atmosphere ✔ What is the sodium layer? How does it behave? ✔ Physics of sodium atom excitation • Lasers used in astronomical laser guide star AO • Wavefront errors for laser guide star AO Page 46 Types of lasers: Outline • Principle of laser action • Lasers used for Rayleigh guide stars • Lasers used for sodium guide stars Page 47 Overall layout (any kind of laser) Page 48 Principles of laser action Stimulated emission Mirror Page 49 General comments on guide star lasers • Typical average powers of a few watts to 20 watts – Much more powerful than typical laboratory lasers • Class IV lasers (a laser safety category) – “Significant eye hazards, with potentially devastating and permanent eye damage as a result of direct beam viewing” – “Able to cut or burn skin” – “May ignite combustible materials” • These are big, complex, and can be dangerous. Need a level of safety training not usual at astronomical observatories until now. Page 50 Lasers used for Rayleigh guide stars • Rayleigh x-section ~ -4 ⇒ short wavelengths better • Commercial lasers are available – Reliable, relatively inexpensive Page 51 Example: Frequency doubled Nd:YAG lasers • Nd:YAG means “neodimium-doped yttrium aluminum garnet” • Nd:YAG emits at 1.06 micron • Use nonlinear crystal to convert two 1.06 micron photons to one 0.53 micron photon (2 X frequency) • Example: Coherent’s Verdi laser – Pump light: from laser diodes – Very efficient – Available up to 18 Watts – Pretty expensive » It’s always worrisome when price isn’t listed on the web! Page 52 Types of Rayleigh guide star lasers • SOAR: SAM – Frequency tripled Nd:YAG, λ = 0.35 m, 8W, 10 kHz rep rate • LBT: – Frequency doubled Nd:YAG, λ = 0.53 m, 15 W each, 10 kHz rep rate • William Herschel Telescope: GLAS – Yb:YAG “disk laser” at λ = 0.515 m, 18 W, 5 kHz Page 53 Lasers used for sodium guide stars • 589 nm sodium D2 line doesn’t correspond to any common laser materials • So have to be clever: – Use a dye laser (dye can be made to lase at a range of frequencies) – Or use solid-state laser materials and fiddle with their frequencies somehow » Sum-frequency lasers (nonlinear index of refraction) » Raman scattering » ... Page 54 Dye lasers • Dye can be “pumped” with different sources to lase at variety of wavelengths • Messy liquids, some flammable • Poor energy efficiency • You can build one at home! – Directions on the web • High laser powers require rapid dye circulation, powerful pump lasers Page 55 Dye lasers for guide stars • Single-frequency continuous wave (CW): always “on” – Modification of commercial laser concepts – Subaru (Mauna Kea, HI); PARSEC laser at VLT in Chile – Advantage: avoid saturation of Na layer – Disadvantage: hard to get one laser dye jet to > 3 watts • Pulsed dye laser – Developed for DOE - LLNL laser isotope separation program – Lick Observatory, then Keck Observatory – Advantage: can reach high average power – Disadvantages: potential saturation, less efficient excitation of sodium layer Page 56 Lick Observatory Photo by Dave Whysong, NRAO Page 57 Keck laser guide star Page 58 Galactic Center with Keck laser guide star AO Keck laser guide star AO Best natural guide star AO Andrea Ghez, UCLA group Page 59 Solid-State Lasers for Na Guide Stars: Sum frequency mixing concept • Texample: two diode laser pumped Nd:YAG lasers are sum-frequency combined in a non-linear crystal (1.06 m)-1 + (1.32 m)-1 = (0.589 m)-1 • Kibblewhite (U Chicago and Mt Palomar), Telle and Denman (Air Force Research Lab), Coherent Technologies Incorporated (for Gemini N and S Observatories and Keck 1 Telescope) Page 60 Air Force laser at Starfire Optical Range • Built by Craig Denman Page 61 New generation of lasers: all-fiber laser (Toptica, Pennington and Dawson LLNL) • Example of a fiber laser Page 62 Toptica fiber laser (ESO, Keck 2) Fiber laser Electronics and cooling Page 63 Advantages of fiber lasers • Very compact • Commercial parts from telecommunications industry • Efficient: – Pump with laser diodes - high efficiency – Pump fiber all along its length - excellent surface to volume ratio • Two types of fiber lasers have been demonstrated at the required power levels at 589 nm (Toptica in Europe, Jay Dawson at LLNL) Page 64 Questions about lasers? Page 65 Outline of laser guide star topics Why are laser guide stars needed? ✔ Principles of laser scattering in the atmosphere ✔ What is the sodium layer? How does it behave? ✔ Physics of sodium atom excitation ✔ Lasers used in astronomical laser guide star AO • Wavefront errors for laser guide star AO Page 66 Laser guide star AO needs to use a faint tip-tilt star to stabilize laser spot on sky from A. Tokovinin Page 67 Effective isoplanatic angle for image motion: “isokinetic angle” • Image motion is due to low order modes of turbulence – Measurement is integrated over whole telescope aperture, so only modes with the largest wavelengths contribute (others are averaged out) • Low order modes change more slowly in both time and in angle on the sky • “Isokinetic angle” – Analogue of isoplanatic angle, but for tip-tilt only – Typical values in infrared: of order 1 arc min Page 68 Tip-tilt mirror and sensor configuration Telescope Deformable mirror Tip-tilt mirror Beam splitter Tip-tilt sensor Wavefront sensor Beam splitter Imaging camera Page 69 Sky coverage is determined by distribution of (faint) tip-tilt stars • Keck: >18th magnitude 1 Galactic latitude = 90° Galactic latitude = 30° 271 degrees of freedom 5 W cw laser 0 From Keck AO book Page 70 “Cone effect” or “focal anisoplanatism” for laser guide stars • Two contributions: – Unsensed turbulence above height of guide star – Geometrical effect of unsampled turbulence at edge of pupil from A. Tokovinin Page 71 Cone effect, continued • Characterized by parameter d0 • Hardy Sect. 7.3.3 (cone effect = focal anisoplanatism) FA2 = ( D / d0)5/3 • Typical sizes of d0 ~ a few meters to 20 meters Page 72 Dependence of d0 on beacon altitude from Hardy • One Rayleigh beacon OK for D < 4 m at = 1.65 micron • One Na beacon OK for D < 10 m at = 1.65 micron Page 73 Effects of laser guide star on overall AO error budget • The good news: – Laser is brighter than your average natural guide star » Reduces measurement error – Can point it right at your target » Reduces anisoplanatism • The bad news: – Still have tilt anisoplanatism – New: focus anisoplanatism – Laser spot larger than NGS tilt2 = ( θ / θtilt )5/3 FA2 = ( D / d0 )5/3 meas2 ~ ( 6.3 / SNR )2 Page 74 Compare NGS and LGS performance Page 75 Main Points • Rayleigh beacon lasers are straightforward to purchase, but single beacons are limited to medium sized telescopes due to focal anisoplanatism • Sodium layer saturates at high peak laser powers • Sodium beacon lasers are harder: – Dye lasers (today) inefficient, hard to maintain – Solid-state lasers are better – Fiber lasers may be better still • Added contributions to error budget from LGS’s – Tilt anisoplanatism, cone effect, larger spot Page 76